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If a and b are +ve integers.......find the probabilty that \frac{1}{2}(a^{2}+b^{2}) is a +ve integer ...
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If a and b are +ve integers.......find the probabilty that \frac{1}{2}(a^{2}+b^{2}) is a +ve integer ...
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If a and b are +ve integers.......find the probabilty that \frac{1}{2}(a^{2}+b^{2}) is a +ve integer ...
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If a and b are +ve integers.......find the probabilty that \frac{1}{2}(a^{2}+b^{2}) is a +ve integer ...
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If a and b are +ve integers.......find the probabilty that \frac{1}{2}(a^{2}+b^{2}) is a +ve integer ...
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Find the focus of the parabola : x2+y2+2xy-6x-2y+3 = 0 Ans : (1,1) ...
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\lim_{n\rightarrow \infty }\prod_{r=2}^{r=n}{\frac{r^{3}-1}{r^{3}+1}} ...
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\lim_{n\rightarrow \infty }\prod_{r=2}^{r=n}{\frac{r^{3}-1}{r^{3}+1}} ...
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the value of \int_{1}^{e}{} (1+x2logx)/(x+x2logx)dx is not giving the choices please verify the answer. ...
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the value of \int_{1}^{e}{} (1+x2logx)/(x+x2logx)dx is not giving the choices please verify the answer. ...
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the value of \int_{1}^{e}{} (1+x2logx)/(x+x2logx)dx is not giving the choices please verify the answer. ...
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let x and y be two numbers chosen at random from set {1,2,3......n}with replacement.let Qn(p) denote probability that (xp-1 -yp-1) is divisible by p then find Qn(p) in terms of p and n and find Q25(3) ...
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A diwali cracker known as sudarshan chakra works on the principle of thrust. Consider such a toy the centre of which is hinged. The initial mass of the toy is M0 and radius is R. The toy is in the shape of a spiral the turns ...
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let x and y be two numbers chosen at random from set {1,2,3......n}with replacement.let Qn(p) denote probability that (xp-1 -yp-1) is divisible by p then find Qn(p) in terms of p and n and find Q25(3) ...
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how to do this q using congruences find the remainder wen 32n+2-8n-9 is divided by 64? i know the procedure by binomial ...
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A function f(x) = max.(sinx, cosx, 1-cosx) is not derivable for some x in [0, 2Ï€] which may lie in the interval....... A) [0,Ï€/2) B) [Ï€,3Ï€/2) C) [Ï€/2,Ï€) D) [3Ï€/2,2Ï€] (More than one options may be correct) ...
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A function f(x) = max.(sinx, cosx, 1-cosx) is not derivable for some x in [0, 2Ï€] which may lie in the interval....... A) [0,Ï€/2) B) [Ï€,3Ï€/2) C) [Ï€/2,Ï€) D) [3Ï€/2,2Ï€] (More than one options may be correct) ...
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let f(x)=x^{3}+x^{2}+100x+7sinx then the eq \frac{1}{y-f(1)}+ \frac{2}{y-f(2)}+ \frac{3}{y-f(3)}=0 has 1)exactly one root lying in (f(1),f(2)) 2)booth roots lying in (f(2),f(3)) 3)exactly one root lying in (-∞,f(1)) 4)exact ...
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A man falls from a height of h metres from a building (free fall) directly onto the ground. The man has to once again travel upwards after t=√ 2h/g seconds violating all possible laws of Physics......How is this possible ? ...
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if the squares of a 8x8 chess board are painted either red or black at random 1)the probability taht not all squares in any column are allternating in color 3)the probability that all the squares in any column are of same col ...
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if the squares of a 8x8 chess board are painted either red or black at random 1)the probability taht not all squares in any column are allternating in color 3)the probability that all the squares in any column are of same col ...
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if the squares of a 8x8 chess board are painted either red or black at random 1)the probability taht not all squares in any column are allternating in color 3)the probability that all the squares in any column are of same col ...
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if the squares of a 8x8 chess board are painted either red or black at random 1)the probability taht not all squares in any column are allternating in color 3)the probability that all the squares in any column are of same col ...
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if the squares of a 8x8 chess board are painted either red or black at random 1)the probability taht not all squares in any column are allternating in color 3)the probability that all the squares in any column are of same col ...
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if the squares of a 8x8 chess board are painted either red or black at random 1)the probability taht not all squares in any column are allternating in color 3)the probability that all the squares in any column are of same col ...
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if the squares of a 8x8 chess board are painted either red or black at random 1)the probability taht not all squares in any column are allternating in color 3)the probability that all the squares in any column are of same col ...
